06473nam 2201393 450 991079838680332120230808192935.01-4008-8124-210.1515/9781400881246(CKB)3710000000657093(EBL)4336802(SSID)ssj0001646505(PQKBManifestationID)16417298(PQKBTitleCode)TC0001646505(PQKBWorkID)14821288(PQKB)11421150(MiAaPQ)EBC4336802(StDuBDS)EDZ0001756492(DE-B1597)474290(OCoLC)979882333(OCoLC)990414087(DE-B1597)9781400881246(Au-PeEL)EBL4336802(CaPaEBR)ebr11206663(CaONFJC)MIL920301(OCoLC)949276252(EXLCZ)99371000000065709320151030d2016 uy| 0engur|n|---|||||txtccrFourier restriction for hypersurfaces in three dimensions and Newton polyhedra /Isroil A. Ikromov and Detlef MüllerPrinceton :Princeton University Press,[2016]1 online resource (269 p.)Annals of mathematics studies ;number 194Description based upon print version of record.0-691-17055-X 0-691-17054-1 Includes bibliographical references and index.Frontmatter -- Contents -- Chapter 1. Introduction -- Chapter 2. Auxiliary Results -- Chapter 3. Reduction to Restriction Estimates near the Principal Root Jet -- Chapter 4. Restriction for Surfaces with Linear Height below 2 -- Chapter 5. Improved Estimates by Means of Airy-Type Analysis -- Chapter 6. The Case When hlin(Φ) ≥ 2: Preparatory Results -- Chapter 7. How to Go beyond the Case hlin(Φ) ≥ 5 -- Chapter 8. The Remaining Cases Where m = 2 and B = 3 or B = 4 -- Chapter 9. Proofs of Propositions 1.7 and 1.17 -- Bibliography -- IndexThis is the first book to present a complete characterization of Stein-Tomas type Fourier restriction estimates for large classes of smooth hypersurfaces in three dimensions, including all real-analytic hypersurfaces. The range of Lebesgue spaces for which these estimates are valid is described in terms of Newton polyhedra associated to the given surface.Isroil Ikromov and Detlef Müller begin with Elias M. Stein's concept of Fourier restriction and some relations between the decay of the Fourier transform of the surface measure and Stein-Tomas type restriction estimates. Varchenko's ideas relating Fourier decay to associated Newton polyhedra are briefly explained, particularly the concept of adapted coordinates and the notion of height. It turns out that these classical tools essentially suffice already to treat the case where there exist linear adapted coordinates, and thus Ikromov and Müller concentrate on the remaining case. Here the notion of r-height is introduced, which proves to be the right new concept. They then describe decomposition techniques and related stopping time algorithms that allow to partition the given surface into various pieces, which can eventually be handled by means of oscillatory integral estimates. Different interpolation techniques are presented and used, from complex to more recent real methods by Bak and Seeger.Fourier restriction plays an important role in several fields, in particular in real and harmonic analysis, number theory, and PDEs. This book will interest graduate students and researchers working in such fields.Annals of mathematics studies ;number 194.HypersurfacesPolyhedraSurfaces, AlgebraicFourier analysisAiry cone.Airy-type analysis.Airy-type decompositions.Fourier decay.Fourier integral.Fourier restriction estimate.Fourier restriction problem.Fourier restriction theorem.Fourier restriction.Fourier transform.Greenleaf's restriction.Lebesgue spaces.LittlewoodАaley decomposition.LittlewoodАaley theory.Newton polyhedra.Newton polyhedral.Newton polyhedron.SteinДomas-type Fourier restriction.auxiliary results.complex interpolation.dyadic decomposition.dyadic decompositions.dyadic domain decompositions.endpoint estimates.endpoint result.improved estimates.interpolation arguments.interpolation theorem.invariant description.linear coordinates.linearly adapted coordinates.normalized measures.normalized rescale measures.one-dimensional oscillatory integrals.open cases.operator norms.phase functions.preparatory results.principal root jet.propositions.r-height.real interpolation.real-analytic hypersurface.refined Airy-type analysis.restriction estimates.restriction.smooth hypersurface.smooth hypersurfaces.spectral localization.stopping-time algorithm.sublevel type.thin sets.three dimensions.transition domains.uniform bounds.van der Corput-type estimates.Hypersurfaces.Polyhedra.Surfaces, Algebraic.Fourier analysis.516.3/52SI 830rvkIkromov Isroil A.1961-1566820Müller Detlef1954-MiAaPQMiAaPQMiAaPQBOOK9910798386803321Fourier restriction for hypersurfaces in three dimensions and Newton polyhedra3837699UNINA